# Confusion in 16-bit data-type range

In a 16 Bit C compiler we have 2 bytes to store an integer, and 1 byte for a character. For unsigned integers the range is 0 to 65535. For signed integers the range is -32768 to 32767. For unsigned character, 0 to 255. According to the integer type, shouldn't the signed character range be like -128 to 127. But why -127 to 127? What about the remaining one bit?

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I think you're mixing two things:

1. What ranges the standard requires for `signed char`, `int` etc.
2. What ranges are implemented in most hardware these days.

These don't necessarily have to be the same as long as the range implemented is a superset of the range required by the standard.

According to the C standard, the implementation-defined values of `SCHAR_MIN` and `SCHAR_MAX` shall be equal or greater in magnitude (absolute value) to, and of the same sign as:

``````SCHAR_MIN  -127
SCHAR_MAX  +127
``````

i.e. only 255 values, not 256.

However, the limits defined by a compliant implementation can be 'greater' in magnitude than these. i.e. `[-128,+127]` is allowed by the standard too. And since most machines represent numbers in the 2's complement form, `[-128,+127]` is the range you will get to see most often.

Actually, even the minimum range of `int` defined by the C standard is symmetric about zero. It is:

``````INT_MIN    -32767
INT_MAX    +32767
``````

i.e. only 65535 values, not 65536.

But again, most machines use 2's complement representation, and this means that they offer the range `[-32768,+32767]`.

While in 2's complement form it is possible to represent 256 signed values in 8 bits (i.e. `[-128,+127]`), there are other signed number representations where this is not possible.

In the sign-magnitude representation, one bit is reserved for the sign, so:

``````00000000
10000000
``````

both mean the same thing, i.e. `0` (or rather, `+0` and `-0').

This means, one value is wasted. And thus sign-magnitude representation can only hold values from -127 (`11111111`) to +127 (`01111111`) in 8 bits.

In the one's complement representation (negate by doing bitwise NOT):

``````00000000
11111111
``````

both mean the same thing, i.e. `0`.

Again, only values from -127 (`10000000`) to +127 (`01111111`) can be represented in 8 bits.

If the C standard required the range to be `[-128,+127]`, then this would essentially exclude machines using such representations from being able to efficiently run C programs. They would require an additional bit to represent this range, thus needing 9 bits to store signed characters instead of 8. The logical conclusion based on the above is: This is why the C standard requires `[-127,+127]` for signed characters. i.e. to allow implementations the freedom to choose a form of integer representation that suits their needs and at the same time be able to adhere to the standard in an efficient way. The same logic applies to `int` as well.

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Thank You for yr explanation . – Smith Dwayne Jul 30 '12 at 10:33